The British are Coming!

Matrices were used very often as codes during WWII. It was an excellent way to encode secret messages. Unless someone has the matrix with which to decode the other matrices it would be nearly impossible to uncode the message. Lucky for you, you have all the information you need to decode the message. Let's see if you can!

From here you need to proceed by multiplying each of these matrices by the inverse of your main matrix. To find the inverse you first will need to find your determinate. To do this you multiply the top right and bottom left numbers and subtract it from the product of the top left and bottom right numbers. Your determinate is -1. -1 is then multiplied by each integer in your matrix, giving you:

[ 3 2]
[-4 -3]

You then proceed to switch the top left and bottom right numbers and reverse the sign on your other two numbers. From here you multiply each of the numbers in the matrix by your determinate. Your new matrix is:

[-3 -2]
[ 4 3]

You need to multiply the two numbers in the 1x2 matrices by the first two integers in your 2x2 main matrix. For example:

[11 12]
*
[-3 -2]
[ 4 3]

You would need to take [11*-3 + 12*4 11*-2 + 12*3]. You would get [15 14]. If you proceed using the same process through all of the 1x2 matrices, your new code would be: